Category:Minimal surfaces
Here is a list of articles in the Minimal surfaces category of the Computing portal that unifies foundations of mathematics and computations using computers. *Minimal surfaces — a surface (mathematics) that is unique among all surfaces with a given property in minimizing area, in calculus−mathematics terminology.
Pages in category "Minimal surfaces"
The following 34 pages are in this category, out of 34 total.
- Minimal surface (computing)
A
- Almgren–Pitts min-max theory (computing)
- Associate family (computing)
B
- Björling problem (computing)
- Bour's minimal surface (computing)
- Bryant surface (computing)
C
- Catalan's minimal surface (computing)
- Catenoid (computing)
- Chen–Gackstatter surface (computing)
- Costa's minimal surface (computing)
D
- Double bubble conjecture (computing)
E
- Enneper surface (computing)
G
- Gyroid (computing)
H
- Heegaard splitting (computing)
- Helicoid (computing)
- Henneberg surface (computing)
K
- K-noid (computing)
L
- Lidinoid (computing)
M
- Minimal surface of revolution (computing)
N
- Neovius surface (computing)
- Newton's minimal resistance problem (computing)
P
- Plateau's laws (computing)
- Plateau's problem (computing)
R
- Richmond surface (computing)
- Riemann's minimal surface (computing)
S
- Saddle tower (computing)
- Scherk surface (computing)
- Schwarz minimal surface (computing)
- Soap bubble (computing)
- Soap film (computing)
T
- Triply periodic minimal surface (computing)
W
- Weaire–Phelan structure (computing)
- Weierstrass–Enneper parameterization (computing)